Self-consistent harmonic approximation with non-local couplings

Abstract

We derive the self-consistent harmonic approximation for the 2D XY model with non-local interactions. The resulting equation for the variational couplings holds for any form of the spin-spin coupling as well as for any dimension. Our analysis is then specialized to power-law couplings decaying with the distance r as 1/r2+σ in order to investigate the robustness, at finite σ, of the Berezinskii-Kosterlitz-Thouless (BKT) transition, which occurs in the short-range limit σ ∞. We propose an ansatz for the functional form of the variational couplings and show that for any σ>2 the BKT mechanism occurs. The present investigation provides an upper bound for the lower critical threshold σ=2, above which the traditional BKT transition persists in spite of the LR couplings.